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Algebra 2 Honors Practice Packet 2021
Date Day Class Meeting Information Assignment
(due the next class meeting) 9/16/2021
9/17/2021
Thursday
Friday
3.1 day 1 Factor and Solve
Quadratics
Factor and Solve Quadratics
HW: 3.1 Practice Day 1
9/20/2021
9/21/2021
Monday
Tuesday
3.1 day 2 Factor and Solve
Quadratics Factor and Solve Quadratics
HW: 3.1 Practice Day 2
9/22/2021
9/23/2021
Wednesday
Thursday 3.2 Solve by Square Rooting
3.2 Solve By Square Rooting
HW: 3.2 Practice
9/24/2021
9/27/2021
Friday
Monday Mid Unit Quiz None
9/28/2021
9/29/2021
Tuesday
Wednesday 3.3 Graphs of Quadratics
3.3 Intro to Graphing Quadratics
HW: 3.3 Practice
9/30/2021
10/01/2021
Thursday
Friday 3.4 Completing the Square
3.4 Completing the Square
HW: 3.4 Practice
10/11/2021
10/12/2021
Monday
Tuesday 3.5 Standard and Intercept Form
3.5 Standard and Intercept Form HW: 3.5 Practice
10/13/2021
10/14/2021
Wednesday
Thursday In class: Performance Task
Extra Practice
HW: Extra Practice Worksheet
10/15/2021
10/18/2021
Friday
Monday
3.6 Modeling Quadratics
3.6 Modeling Quadratics
HW: 3.6 Practice
10/19/2021
10/20/2021
Tuesday
Wednesday Quadratics Unit Review
Chapter 3 Practice Test HW: 3 Practice Test
10/21/2021
10/22/2021
Thursday
Friday
Quadratics Unit Test
Begin Polynomials Chapter 3 Test
HW: 4.0 Practice
Be prepared for daily quizzes
All worksheets, notes, and video links are on the math dept website: www.washoeschools.net/DRHSmath
Students who complete every assignment for the semester are eligible for a 2% grade bonus. Students with no
late assignments also get a pizza party!
Show the original problem, all work, and solutions on your own paper!
3.1 Day 1 Practice Problems For #1 – 16, factor each expression completely. 1) b2 + 3b – 40 2) x2 – 16 3) c2 + 8c + 16 4) m2 – 16h8
5) k2 + 81 6) 2x2 + 5x + 3 7) 16g2 + 8g + 1 8) 4r2 – 25
9) 32y2 – 2b2 10) -12y2 + 36y – 27 11) 2x3 – 7x2 + 3x 12) 4x2 – 36
13) 14) 15)2𝑥2 + 38𝑥 + 176 16)𝑥2 + 5𝑥 + 6
3.1 Day 2 Practice Problems
For #17 – 32, solve each equation. 17) x2 – 11x + 30 = 0 18) r2 + 2r = 80 19) x2 = 35 – 2x 20) m2 = 7m
21) 11q2 – 44 = 0 22) 6r2 – 6r + 3 = 8 + r 23) 4x2 – 20x + 25 = 0 24) 14s2 = 21s
25) 26) 27) 9𝑥2 + 6𝑥 + 1 = 0 28)2𝑥2 − 5𝑥 = 3
29) 36𝑥2 = 100 30) 𝑥2 − 5𝑥 − 6 = 0 31) 3𝑥2 − 15𝑥 + 18 = 0
32) 12𝑥2 + 11𝑥 = 36
Algebra 2 Honors Practice Packet 2021 3.2 Practice Problems For # 1 – 7, solve each equation. If needed, use imaginary #s. Leave all answers in radical form, except for #7 (use
decimals rounded to the nearest tenth.)
1. x2 + 5x 2 = 0 2. 2x2 3x + 2 = 0 3. x2 + 5x 4 = 0 4. 2x2 + 2x = 4x 1
5. 2x2 + 3x + 2 = 2x 1 6. 1
2 x2 3x + 2 = 3x 1 7. 3.8x2 = 4.7x 2.1
For #8 – 11: Vertical Motion Three objects are launched from the top of a 220 foot platform. The first object is launched upward at
25 feet per second. The second object is dropped. The third object is launched downward at 15 feet per second.
8) Write a height model for the first object. 9) Write a height model for the second object.
10) Write a height model for the third object. 11) How many seconds until each object hits the ground?
For #12 – 17, solve each equation. Leave all answers in radical form.
12) x2 324 = 0 13) x2 19 = 0 14) 1
2 x2 + 3 = 12 15) 4(x + 5)2 = 64
16) 3(x – 3)2 + 2 = 26 17) 1
3 (x+4)2 1 = 5
18) A rectangular garden has an area of 84 yd2. The length of the garden is x + 7, and the width is x + 2. Find the value of x and the
dimensions of the garden.
19) A water balloon is tossed from a window 64 feet above the sidewalk. How long does it take for the water balloon to hit the
sidewalk if the equation of the water balloon’s path is h = -16t2 + 64, where h is the height in feet, and t is the time in seconds?
20) The area of a square rug is 36 m2. If each side is represented by 2x, then find the perimeter of the rug.
21) A hill on a roller coaster can be modeled by the equation y = -3x2 + 90x, where x is the horizontal distance
and y is the height, in yards. The hill starts and stops at the two zeros of the function. What is the horizontal
distance between the start and stop of the hill?
22) You have made a rectangular quilt that is 5 ft by 4 ft. You have 10 square feet of fabric left, and so you decide to
make a decorative border of uniform width. What should the width of the quilt’s border be?
3.3 Practice Problems
For # 1 – 4, Graph the function. Label the vertex and axis of symmetry and state the domain and range in interval
notation.
1) y = 2(x +1)2 + 1 2) y = 3(x 2)2 + 2 3) y = (x + 4)2 +14 4) f(x) = −1
2 (x + 2)2 – 1
5) The flight of a particular golf shot can be modeled by the function y = 0.001(x 133)2 + 19.6,
where x is the horizontal distance (in yards) from the impact point and y is the height (in yards). The
graph is shown. How many yards away from the impact point does the golf ball land? What is the
maximum height in yards of the golf shot?
6) Given the function, 𝑓(𝑥) = −(𝑥 − 4)2 − 3 , state whether the parabola opens up or down and the
maximum or minimum value.
A. Down, Maximum, −3 B. Down, Maximum, 4 C. Up, Maximum, 4 D. Up, Minimum, −3
7) What are the solutions to the quadratic equation, 3𝑥2 + 7𝑥 + 11 = 5𝑥 + 7 ?
A. 𝑥 =−2±2𝑖√11
3 B. 𝑥 =
−1±2𝑖√11
3 C. 𝑥 =
−1±𝑖√11
3 D. 𝑥 =
±𝑖√11
3
8) Graph 𝑦 = −𝑥2 over the domain (-2, 1] ∪ [2, 4) 9) Graph 𝑦 = 𝑥2 + 4 over the domain [-1, 2] ∪ (3, 4)
3.3 continued on the next page…
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continued on next page…
continued on next page…
Algebra 2 Honors Practice Packet 2021
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3.3 continued… 10) A rollercoaster’s path is modeled by the equation y = - 4(x – 95)2 + 110, where x is the horizontal distance and y is the change in
height, in yards, from the start of the rollercoaster. What is the maximum height reached by the rollercoaster?
11) The area of the rectangle shown is 22 in2. Find the value of x.
12) Multiple choice: Simplify: √−25 ∙ √−36 A. 30𝑖 B. −30 C. 30 D. 900
13) Solve the system of equations, state the solution for 𝑏 .{−3𝑎 = 36
10𝑎 + 3𝑐 = 92𝑏 + 5𝑐 = 23
A) 96 B) 43 C) -12 D) -96
For #14 – 19, graph each quadratic. Label the vertex, axis of symmetry, and x-intercepts. State the domain and
range in interval notation. 14) y = (x + 2)(x 4) 15) y = (x + 4)(x + 3) 16) y = (x + 4)(x + 2)
17) y = (x 3)(x + 1) 18) y = 3(x 1)(x 4) 19) y = 3x(x + 7)
20) Translate the graph up 2 and left 6 . What is the function for the graph obtained after the translation?
A. 𝑓(𝑥) = |𝑥 − 2| B. 𝑓(𝑥) = |𝑥| − 2
C. 𝑓(𝑥) = |𝑥 + 2| D. 𝑓(𝑥) = |𝑥| + 2
21) Compare the two functions represented below. Determine which of the following statements is true.
Function 𝑓(𝑥) Function 𝑔(𝑥)
𝑔(𝑥) = (𝑥 − 6)2 − 4
A. The functions have the same vertex.
B. The minimum value of 𝑓(𝑥) is the same as the minimum value of 𝑔(𝑥).
C. The functions have the same axis of symmetry.
D. The minimum value of 𝑓(𝑥) is less than the minimum value of 𝑔(𝑥).
22) What graph represents the piecewise function? 𝑓(𝑥) = {1
2𝑥 − 1, 𝑥 ≥ 2
2, 𝑥 < 2
A. B. C. D.
23) Graph 𝑦 > −2𝑥2 + 3 24) Graph 𝑦 ≤1
3(𝑥 + 5)2
Algebra 2 Honors Practice Packet 2021
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3.4 Practice Problems
For # 1 – 8, write the quadratic function in vertex form. Then identify the vertex. 1) y = x2 + 14x + 11 2) y = x2 8x + 10 3) f(x) = 2x2 + 4x – 5 4) y = 3x2 9x + 18
5) y = x2 + 12x + 6 6) f(x) = x2 4x + 15 7) y = 2x2 + 6x 3 8) y = 4x2 8x 3
For #9- 12, graph each quadratic function. Identify the vertex, axis of symmetry, y-intercept, and x-intercepts, if
any, and state the domain and range in interval notation. 9) y = x2 + 2x – 3 10) y = x2 – 6x + 5 11) y = 2x2 + 8x +3 12) y = -2x2 + 4x + 3
13) Given the function, 𝑓(𝑥) = 𝑥2 + 2𝑥 + 7, state whether the parabola opens up or down and the maximum or minimum value.
A. Up, Maximum value = 7 B. Up, Minimum value = 6
C. Down, Minimum value = 7 D. Down, Maximum value = 6
For #14-16, state the value of k when each function is written in vertex form f(x) = a(x-h)² +k.
14) 𝑦 = 𝑥2 + 3𝑥 − 4 15) 𝑦 = −2𝑥2 + 6𝑥 + 7 16) 𝑦 = 3𝑥2 − 12𝑥 − 2
17) Simplify: 3𝑖27√−6√2
18) Simplify: (3 − 7𝑖)2
A. −40 + 0𝑖 B. −40 − 42𝑖 C. 58 + 0𝑖 D. 58 − 42𝑖
19) Which equation is represented by the graph?
A. 𝑦 = (𝑥 − 3)2 − 5
B. 𝑦 = 2(𝑥 − 3)2 − 5
C. 𝑦 = 2(𝑥 + 3)2 − 5
D. 𝑦 = −(𝑥 + 3)2 − 5
20) Given 𝑓(𝑥) = −0.1𝑥2 + 0.3𝑥 + 0.7, state whether the parabola opens up or down and the maximum or minimum value.
3.5 Practice Problems For #1 – 5, graph each function. Label the vertex, axis of symmetry and state the domain and range in interval
notation.
1) y = 4x2 1 2) f (x) = x2 + 2x 3) y = 2x2 + 4x 3 4) y = 2x2 5x +3 5) g(x)= 6x2 4x + 1
6) In a track and field event contest, a contestant had a throw in the shot put that can be modeled by y = -0.02x(x – 55.4). How long
was the throw, if x is the shot put’s horizontal distance (in feet), and y is the vertical distance (in feet)? What was the maximum height
of the shot put?
7) An amusement park has a bungee swing that customers can pay to ride. The path of the swing is modeled
by f(x) = 0.035(x +5)(x – 240), where x is the horizontal distance from the start of the swing, and f(x) is the
vertical distance reached by the swing, both in feet. Find the horizontal length of the motion of the swing for
one movement, and find the minimum height reached by the swing.
8) An soccer ball is kicked from the ground with an initial velocity of 32 feet per second. After how many seconds does the soccer
ball hit the ground, and what is the maximum height reached?
3.5 continued on the next page…
Algebra 2 Honors Practice Packet 2021
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3.5 continued…
9) A water balloon is launched upward from an initial height (ℎ0) of 15 feet with an initial velocity (𝑣0) of 50 feet per second. The
height of the water balloon can be modeled by the equation ℎ = −16𝑡2 + 𝑣0𝑡 + ℎ0 where t is time in seconds and h is the height
above the ground. Find the time it takes the water balloon to hit the ground level. (Round your answers to the nearest hundredth).
For #10 – 13, find the zeros (x-intercepts) of each quadratic function, if possible. Use exact answers (fractions, no
decimals), and only include real solutions.
10) y 3x2 2x 11) y 12x2 8x 15 12) f(x) 5x2 25x 30 13) y 4x2 1
14) Which function is represented by the graph to the right?
A. 𝑓(𝑥) = (𝑥 − 2)(𝑥 + 3) B. 𝑓(𝑥) = (𝑥 − 2)(𝑥 − 3)
C. 𝑓(𝑥) = (𝑥 + 2)(𝑥 − 3)
D. 𝑓(𝑥) = (𝑥 + 2)(𝑥 + 3)
15) Graph f(x) = x(x – 4) over the domain [0, 3) ∪ [4, 5)
16) Compare the axis of symmetry and the minimum values for the two functions below.
ℎ(𝑥) = 2(𝑥 + 3)(𝑥 − 7)
𝑗(𝑥) = 𝑥2 − 4𝑥 − 21
Determine which of the following statements is correct.
A. The functions ℎ(𝑥) and 𝑗(𝑥) have the same axis of symmetry, but the minimum value of ℎ(𝑥)is less
than the minimum value of 𝑗(𝑥).
B. The functions ℎ(𝑥) and 𝑗(𝑥) have the same axis of symmetry, but the minimum value of ℎ(𝑥)is greater
than the minimum value of 𝑗(𝑥).
C. The functions ℎ(𝑥) and 𝑗(𝑥) do not have the same axis of symmetry, and the minimum value of ℎ(𝑥)is
less than the minimum value of 𝑗(𝑥).
D. The functions ℎ(𝑥) and 𝑗(𝑥) do not have the same axis of symmetry, and the minimum value of ℎ(𝑥)is
greater than the minimum value of 𝑗(𝑥).
17) Find the perimeter of the rectangle shown if the area is 84 in2.
18) Simplify: (4 − 5𝑖)(4 + 5𝑖)
A. −9 B. 41 C. 16 + 25𝑖 D. 16 − 25𝑖
Unit 3 Extra Practice Wk (do all work on your own paper): For #1 – 3: Graph each function. Include the vertex, x-intercepts, y-intercept, axis of symmetry, domain, range, and max/min.
1) 𝑓(𝑥) = −2(𝑥 − 3)2 + 32 2) 𝑦 =1
2(𝑥 − 3)(𝑥 + 1) 3) 𝑦 = 𝑥2 − 11𝑥 + 28
4. An object is launched from a 384 foot tall platform with an initial velocity of 32 feet per second. After how many seconds will the
object reach its maximum height? What is the maximum height? When will it hit the ground?
5. Find the x-intercepts of the function, 𝑦 = 2𝑥2 − 4𝑥 + 10. Give an exact answer.
6. Write the equation for a quadratic function with a vertex at (3, -2) passing through the point (1, 6). Write your answer in vertex
form.
7. A hill on a roller coaster can be modeled by the equation y = -3x2 + 90x, where x is the horizontal distance and y is the height, in
yards. The hill starts and stops at the two zeros of the function. What is the horizontal distance between the start and stop of the hill?
Unit 3 Extra Practice Wk continued on the next page…
Algebra 2 Honors Practice Packet 2021
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Unit 3 Extra Practice Wk continued…
8. Write the function in vertex form: 𝑓(𝑥) = 4𝑥2 − 12𝑥 + 5.
9. Find the x-intercepts of the function: 𝑦 = 3𝑥2 + 11𝑥 − 20.
10. A quadratic function has x-intercepts at 3 and -2 and passes through the point (0, 5). Write the function in standard form.
3.6 Practice For #1 – 4, write a quadratic function in vertex form whose graph has the give vertex and passes through the given
point. 1) vertex: (0, 0); point: (2, 4) 2) vertex: (4, 2); point: (3, 1) 3) vertex: (3, 2); point: (7, 6)
4) vertex: (4, 5); point: (1, 13)
For # 5 – 8, write a quadratic function in intercept form whose graph has the given x-intercepts and passes through
the given point.
5) x-intercepts: 2, 3; point: (4, 2) 6) x-intercepts: 0, 4; point: (-1, 20) 7) x-int:3,2; point: (4, 6)
8) x-intercepts: 4, 6; point: (5, 2)
9) Write the equation of the parabola opening upward with x-intercepts 0 and 4 and a compression factor of ½ in standard form,
intercept form, and vertex form.
10) Which description explains how the graph of 𝑓(𝑥) = 𝑥2 − 4𝑥 + 4 is related to the graph of 𝑔(𝑥) = 𝑥2 − 4𝑥 − 2 shown here?
A. 𝑓(𝑥) is vertically stretched to make 𝑔(𝑥)
B. 𝑓(𝑥) is translated down 6 units to make 𝑔(𝑥) C. 𝑓(𝑥) is translated 6 units to the left to make 𝑔(𝑥)
D. 𝑓(𝑥) is compressed vertically to make 𝑔(𝑥)
11) Translate 𝑦 = 𝑥2 − 4𝑥 + 6 five (5) units to the left. What is the graph obtained after the translation?
A. B. C. D.
12) Simplify: 6+2𝑖
2−𝑖 A. 2 − 3𝑖 B. 2 + 3𝑖 C. 2 + 2𝑖 D. 3 + 2𝑖
13)
Which of following functions represent the parabola opening upwards with a compression factor of 1
4
and x-intercepts (−4, 0) and (6, 0)?
Option I: 𝑦 =1
4(𝑥 + 4)(𝑥 − 6) Option II: 𝑦 =
1
4𝑥2 +
5
2𝑥 − 6
Option III: 𝑦 = 4(𝑥 − 4)2 + 6 Option IV: 𝑦 =1
4𝑥2 −
1
2𝑥 − 6
Option V: 𝑦 =1
4(𝑥 − 1)2 −
25
4
3.6 continued on the next page…
Algebra 2 Honors Practice Packet 2021 3.6 continued…
14) Given the diagram below, approximate to the nearest foot how many feet of walking distance a person saves
by cutting across the lawn instead of walking on the sidewalk.
A. 60 𝑓𝑒𝑒𝑡 B. 48 feet C. 36 𝑓𝑒𝑒𝑡 D. 24 feet
16) A parabola has x-intercepts at −3 and 7and goes through the point (−5, 6). What other point is on the parabola?
A. (−8, 42) B. (−1, 22) C. (8, 44) D. (11, 14)
17) Write a system of equations that could be solved to write the quadratic function in standard form for the parabola
passing through the points (1, 4), (3, −2), and (−2, 17)?
Unit 3 Practice Test For #1 – 6, graph each function. Find the vertex, axis of symmetry, x-intercepts (if any), and y-intercepts. State the domain
and range in interval notation.
1) g(x) = x2 – 2x – 3 2) y = 2(x + 3)2 + 1 3) y = 4(x + 2)(x + 4)
4) 𝑦 =1
3(𝑥 − 3)2 − 3 5) 𝑓(𝑥) = −2𝑥2 + 9𝑥 − 4 6) ℎ(𝑥) = −𝑥(𝑥 − 6)
For #7 – 9, does the function have a maximum or a minimum? Then find that value.
7) y = - (x – 4)2 + 5 8) y = 3x(x – 3) 9) y = x2 – 4x + 9
10) A quadratic function has a vertex at (-2, -2), and passes through (7, -1). Write the equation for this quadratic in vertex form.
11) A object is launched from the top of a 110 foot building at an initial velocity of 32 feet per second. What is the maximum height
reached by the object? After how many seconds will the object hit the ground? At what time does the object reach the maximum
height?
12) A rectangle has a width of x + 2 and a length of 2x – 1, with an area of 42 in2. Find the perimeter of the rectangle.
13) A soccer ball lying on the ground is kicked into the air, and the path of its motion can be modeled by the equation
y = -0.52x(x – 34), where x is the horizontal distance in meters and y is the vertical distance in meters. What is the total horizontal
distance travelled by the soccer ball when it hits the ground?
14) Find the values of h and k when the function, 𝑦 = −3𝑥2 + 12𝑥 − 7, is written in vertex form, y = a(x – h)² + k.
15) Find the x-intercepts of the function g(x) = 9x2 – 13x + 4.
16) Solve the equation: 3x2 – 8x + 11 = 0. If needed, leave your answers in radical form.
17) A quadratic has x-intercepts at -8 and 5, and passes through the point (7, -9). Write the equation of the quadratic in intercept
form.
18) Patty’s Frisbee throw can be modeled by y = -0.02(x + 6)(x – 52.4). How long was the throw, if x is the Frisbee’s horizontal
distance (in feet), and y is the vertical distance (in feet)? What was the maximum height of the Frisbee?
19) Write the following quadratic in vertex form: y = x 2 – 4x + 7.
Unit 3 Practice Test continued on the next page…
15) Which of the following is the quadratic equation for a parabola with a vertex of (−8, 2) going through the point (−13, 12) ?
A. 𝑦 = −
10
441(𝑥 + 8)2 + 2 C. 𝑦 =
2
5(𝑥 + 8)2 + 2
B. 𝑦 = −2
5(𝑥 − 8)2 + 2 D. 𝑦 =
10
441(𝑥 − 8)2 + 2
Algebra 2 Honors Practice Packet 2021
Unit 3 Practice Test continued…
20) Write the following quadratic in vertex form: y = -3x 2 +6x – 5.
21) Write the equation of the parabola opening downward with a compression factor of 1/2 and x-intercepts of -4 and 6 in standard
form, intercept form and vertex form.
22) Write a system of equations that could be solved to write the quadratic function in standard form for the parabola passing through
the points (−1, 14), (4, 29), and (2, 5). Set up—do not solve.
23) Graph 𝑓(𝑥) = (𝑥 + 3)2 + 1 over the domain (-5, -3] ∪ (-2 , 0]
24) Graph y = - x(x + 6) over the domain [-7,-5) ∪ (-1, 2] 25) Graph 𝑦 > .25(𝑥 + 2)2 + 3
For #26-28, simplify the expression.
26) (3i)(-i + 3)(2i – 4) 27) (2i + 6)² 28) 2√5
3−√5
For #29-31, solve each system:
29) {𝑥2 + 10𝑥 + 6𝑦 + 8 = 13
2𝑥 + 3𝑦 = 7 30) {
𝑓(𝑥) = 3𝑥2 − 7𝑥 + 4
𝑔(𝑥) = 5𝑥 + 4 31) {
𝑥2 + 12𝑥 + 8𝑦 = −152𝑥 + 2𝑦 = −9
Problems ANSWERS
3.1 Day 1 Answers
1) (b + 8)(b – 5) 2) (x + 4)(x – 4) 3) (c + 4)2 4) (m + 4h4)(m – 4h4)
5) (k + 9i)(k – 9i) 6) (2x + 3)(x + 1) 7) (4g + 1)2 8) (2r + 5)(2r – 5)
9) 2(4y + b)(4y – b) 10) -3(2y – 3)2 11) x(2x – 1)(x – 3) 12) 4(x + 3)(x – 3)
13)(x-3)(x+3)(x-3i)(x+3i) 14) (3x-2)(x+9) 15) 2(x+11)(x-8) 16) (x+3)(x+2)
3.1 Day 2 Answers
17) 5, 6 18) -10, 8 19) -7, 5 20) 0, 7
21) ±2 22) −1
2,
5
3 23)
5
2 24) 0,
3
2
25) -1
3,4 26) -2/3, 3/4 27)−
1
3 28)3, −
1
2
29) ±5
9 30) 6, −1 31) 3,2 32)−
9
4,
4
3
3.2 Answers
1) −5 ±√33
2 2)
3±𝑖√7
4 3)
−5±√41
2 4)
1 ± 𝑖
2 5) −
1
2, 3
6) 6 ± √30 7) 0.62 0.41i 8) h 16t2 25t 220 9) h 16t2 220
10) h 16t2 15t 220 11) 1st object: 4.57 sec; 2nd object: 3.71 sec; 3rd object: 3.27 sec
12) 18 13) ±√19 14) ±3√2 15) 9, 1
16) 3 ± 2√2 17) −4 ± 3√2 18) x = 5; dimensions 12 yd by 7 yd
19) 2 seconds 20) 24m 21) 30 yards 22) ½ foot (or 6 inches)
continued on next page…
Algebra 2 Honors Practice Packet 2021
3.3 Answers
1) 2) 3) 4)
D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞)
R: [1, +∞) R: (-∞, 2] R: (-∞, 14] R: (-∞, -1]
5) 273 yds; 19.6 yds max height 6) A 7) C
8) 9)
10) 110 yards 11) 1.5 12) B 13) D
14) 15) 16) 17)
D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞)
R: [-9, +∞) R: [-.25, +∞) R: [-1, +∞) R: (-∞, 4]
18) 19) 20) C 21) B 22) D
23) 24)
D: (-∞, +∞) D: (-∞, +∞)
R: [- 27
4, +∞) R: (-∞,
147
4]
3.4 Answers
1) y = (x + 7)2 38; (7, 38) 2) y = (x 4)2 6; (4, 6) 3) f(x) = 2(x + 1)2 7; (1, 7)
4) y = 3 (𝑥 −3
2)
2
+ 45
4; (
3
2,
45
4) 5) y = (x + 6)2 30; (6, 30) 6) f(x) = (x 2)2 + 11; (2, 11)
7) y = −2 (𝑥 −3
2)
2
+ 3
2; (
3
2,
3
2) 8) y = −4(𝑥 + 1)2 + 1; (−1, 1)
9) 10)
Vertex: (-1, -4)
Axis: x = -1
y-int: (0, -3)
x-int: (-3,0) and (1, 0)
D: (-∞, +∞)
R: [-4, +∞)
Vertex: (3, -4)
Axis: x = 3
y-int: (0, 5)
x-int: (1,0) and (5, 0)
D: (-∞, +∞)
R: [-4, +∞)
Algebra 2 Honors Practice Packet 2021
Vertex (-2, -5)
Axis: 𝑥 = −2
y-int: (0, 3)
x-int: (-0.4, 0) and (-3.6, 0)
D: (−∞, ∞)
R: {−5, ∞)
3.4 Answers, continued…
11) 12)
13) B 14) -25/4 15) 23/2 16) -14 17) 6√3 18) B 19) A
20) opens down, maximum value of 37
40
3.5 Answers
1) 2) 3) 4) 5)
D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞) D: (-∞, +∞)
R: (-∞, -1] R: [-1, +∞) R: [-5, +∞) R: [-1/8, +∞) R: (-∞, 5/3]
6) length: 55.4 feet; max: 15.34 feet 7) length: 245 feet; min: -525.2 feet
8) time: 2 seconds; max: 16 feet 9) t = 3.40 sec 10) −2
3, 0 11) −
3
2,
5
6 12) 2, 3
13) none 14) C 15) 16) A 17) 38 inches 18) B
Unit 3 Extra Practice Wk answers:
1. Vertex: (3, 32), x-int: (7, 0), (-1, 0) 2. Vertex: (1, -2), x-int: (3, 0), (-1, 0)
y-int: (0, 14), AS: x = 3, D: All reals y-int: (0, -1.5), AS: x = 1, D: All reals
range: (−∞, 32], max at 32 range: [−2, ∞), min at -2
Vertex: (1, 5)
Axis: x = 1
y-int: (0, 3)
x-int: (-.6,0) and (2.6, 0)
D: (-∞, +∞)
R: (-∞, 5]
Algebra 2 Honors Practice Packet 2021
Vertex: (3, -3)
Axis of sym: x = 3
x-int at 0 and 6
y-int at 0
D: (-∞, +∞)
R: [-3, +∞)
Unit 3 Extra Practice Wk Answers, continued…
3. Vertex: (5.5, -2.25), x-int: (7, 0), (4, 0) 4. at max after 1 second, max is 400 feet, hits ground after 6 seconds
y-int: (0, 28), AS: x = 5.5, D: All reals 5. 1 ± 2𝑖 6. 𝑦 = 2(𝑥 − 3)2 − 2
range: [−2.25, ∞), min at -2.25 7. 30 yards 8. 𝑓(𝑥) = 4 (𝑥 −3
2)
2
− 4
9. 𝑥 =4
3, −5 10. 𝑦 = −
5
6𝑥2 +
5
6𝑥 + 5
3.6 Answers
1) y = x2 2) y = (x + 4)2 2 3) y = ½ (x – 3)2 – 2 4) y = 2(x 4)2 5 5) y = (x 3)(x 2)
6) y = 4x(x 4) 7) y = 3(x + 2)(x + 3) 8) y 2(x 4)(x 6)
9) Standard Form: 𝑦 =1
2𝑥2 − 2𝑥; Intercept Form: 𝑦 =
1
2𝑥(𝑥 − 4); Vertex Form: 𝑦 =
1
2(𝑥 − 2)2 − 2
10) B 11) B 12) C 13) A 14) D 15) C 16) D
17) {𝑎 + 𝑏 + 𝑐 = 4
9𝑎 + 3𝑏 + 𝑐 = −24𝑎 − 2𝑏 + 𝑐 = 17
Unit 3 Practice Test Answers
1) 2) 3)
4) 5) 6)
Vertex: (1, -4)
Axis of sym: x = 1
x-int at -1 and 3
y-int at -3
D: (-∞, +∞)
R: [-4, +∞)
Vertex: (-3, 1)
Axis of sym: x = -3
x-int : none
y-int at 19
D: (-∞, +∞)
R: [1, +∞)
Vertex: (-3, -4)
Axis of sym: x = -3
x-int at -2 and -4
y-int at 32
D: (-∞, +∞)
R: [-4, +∞)
Vertex: (9/4, 49/8)
Axis of sym: x = 9/4
x-int at 1/2 and 4
y-int at -4
D: (-∞, +∞)
R: (-∞, 49/8]
Vertex: (3, 9)
Axis of sym: x = 3
x-int at 0 and 6
y-int at 0
D: (-∞, +∞)
R: (-∞, 9]
Algebra 2 Honors Practice Packet 2021 Unit 3 Practice Test Answers, continued…
7) max at 5 8) min at –6.75 9) min at 5
10) 𝑦 =1
81(𝑥 + 2)2 − 2 11) max of 126 feet; after 3.8 seconds to ground; 1 sec to max 12) 26 inches 13) 34 m
14) h = 2, k = 5 15) (1,0) and (4/9, 0) 16) 4±𝑖√17
3 17) 𝑦 = −
3
10(𝑥 + 8)(𝑥 − 5)
18) 52.4 ft and 17.1 feet 19) y = (x – 2)2 + 3 20) y = -3(x – 1)2 – 2
21) Standard form: 𝑦 = −1
2𝑥2 + 𝑥 + 12; Intercept form: 𝑦 = −
1
2(𝑥 + 4)(𝑥 − 6); Vertex form: 𝑦 = −
1
2(𝑥 − 1)2 +
25
2
22){14 = 𝑎 − 𝑏 + 𝑐
29 = 16𝑎 + 4𝑏 + 𝑐5 = 4𝑎 + 2𝑏 + 𝑐
23) 24)
25)
26) -30 – 30i 27) 32 + 24i 28) 3√5+5
2 29) (−3,
13
3)
30) (0, 4); (4, 24) 31) (−7,5
2) ; (3, −
15
2)